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COCO
2007
Springer

Parity Problems in Planar Graphs

14 years 5 months ago
Parity Problems in Planar Graphs
We consider the problem of counting the number of spanning trees in planar graphs. We prove tight bounds on the complexity of the problem, both in general and especially in the modular setting. We exhibit the problem to be complete for Logspace when the modulus is 2k , for constant k. On the other hand, we show that for any other modulus and in the non-modular case, our problem is as hard in the planar case as for the case of arbitrary graphs. This completely settles the question regarding the complexity of modular computation of the number of spanning trees in planar graphs. The techniques used rely heavily on algebraic-topology. In the spirit of counting problems modulo 2k , we also exhibit a highly parallel ⊕L algorithm for finding the value of a Permanent modulo 2k . Previously, the best known result in this direction was Valiant’s result that this problem lies in P.
Mark Braverman, Raghav Kulkarni, Sambuddha Roy
Added 07 Jun 2010
Updated 07 Jun 2010
Type Conference
Year 2007
Where COCO
Authors Mark Braverman, Raghav Kulkarni, Sambuddha Roy
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